Representation theory of quantized Poincaré algebra. Tensor operators and their applications to one-particle systems
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Publication:1338926
DOI10.1007/BF00739419zbMath0826.16038arXivhep-th/9406146MaRDI QIDQ1338926
Valeriy N. Tolstoy, Henri Ruegg
Publication date: 15 November 1995
Published in: Letters in Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/hep-th/9406146
tensor operatorsrepresentation theoryWigner-Eckart theoremnondeformed Poincaré algebrasquantized Poincaré algebras
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Related Items (7)
TOWARDS CONSTRUCTING ONE-PARTICLE REPRESENTATIONS OF THE DEFORMED POINCARÉ ALGEBRA ⋮ DOUBLY SPECIAL RELATIVITY VERSUS κ-DEFORMATION OF RELATIVISTIC KINEMATICS ⋮ Non-commutative fields and the short-scale structure of spacetime ⋮ Spinning toroidal brane cosmology; a classical and quantum survey ⋮ Parity at the Planck scale ⋮ Deformed discrete symmetries ⋮ RAINBOW STATISTICS
Uses Software
Cites Work
- Unnamed Item
- On q-tensor operators for quantum groups
- New quantum Poincaré algebra and \(\kappa\)-deformed field theory
- ON q-COVARIANT WAVE FUNCTIONS
- Tests of basic quantum mechanics in oscillation experiments
- Tensor operators for quantum groups and applications
- Deformation map and Hermitian representations of k-Poincaré algebra
- Three-dimensional quantum groups from contractions of SU(2)q
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